Junta Distance Approximation with Sub-Exponential Queries
Abstract
Leveraging tools of De, Mossel, and Neeman [FOCS, 2019], we show two different results pertaining to the \emph{tolerant testing} of juntas. Given black-box access to a Boolean function , we give a query algorithm that distinguishes between functions that are -close to -juntas and -far from -juntas, where . In the non-relaxed setting, we extend our ideas to give a (adaptive) query algorithm that distinguishes between functions that are -close to -juntas and -far from -juntas. To the best of our knowledge, this is the first subexponential-in- query algorithm for approximating the distance of to being a -junta (previous results of Blais, Canonne, Eden, Levi, and Ron [SODA, 2018] and De, Mossel, and Neeman [FOCS, 2019] required exponentially many queries in ). Our techniques are Fourier analytical and make use of the notion of "normalized influences" that was introduced by Talagrand [AoP, 1994].
Cite
@article{arxiv.2106.00287,
title = {Junta Distance Approximation with Sub-Exponential Queries},
author = {Vishnu Iyer and Avishay Tal and Michael Whitmeyer},
journal= {arXiv preprint arXiv:2106.00287},
year = {2021}
}
Comments
To appear in CCC 2021